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A string w is said to be a minimal absent word (MAW) for a string S if w does not occur in S and any proper substring of w occurs in S. We focus on non-trivial MAWs which are of length at least 2. Finding such non-trivial MAWs for a given string is motivated for applications in bioinformatics and data compression. Fujishige et al. TCS 2023 proposed a data structure of size (n) that can output the set MAW (S) of all MAWs for a given string S of length n in O (n + |MAW (S) |) time, based on the directed acyclic word graph (DAWG). In this paper, we present a more space efficient data structure based on the compact DAWG (CDAWG), which can output MAW (S) in O (|MAW (S) |) time with O (e) space, where e denotes the minimum of the sizes of the CDAWGs for S and for its reversal SR. For any strings of length n, it holds that e < 2n, and for highly repetitive strings e can be sublinear (up to logarithmic) in n. We also show that MAWs and their generalization minimal rare words have close relationships with extended bispecial factors, via the CDAWG.
Inenaga et al. (Wed,) studied this question.